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This article is cited in 47 scientific papers (total in 48 papers)
Solution of the generalized Saint Venant problem
F. G. Avkhadiev N. G. Chebotarev Research Institute of Mathematics and Mechanics, Kazan State University
Abstract:
A well-known problem in the mathematical theory of elasticity about the torsional rigidity $P(\Omega)$ of a bar whose cross-section is an arbitrary simply connected domain $\Omega$ is considered. It is shown that $P(\Omega)$ is equivalent to the moment of inertia of the domain relative to its boundary. Thus, a new interpretation of the well-known Coulomb's formula is suggested, and on this basis the following problem, which has its origins in works of Cauchy and Saint Venant, is solved: find a geometric parameter equivalent to the torsional rigidity coefficient of elastic bars with simply connected cross-sections. The proof is based on the definition of the torsional rigidity as the norm of a certain embedding operator in a Sobolev space and on the theory of conformal maps. In particular, some conformally invariant inequalities are established.
Received: 26.02.1996 and 18.02.1998
Citation:
F. G. Avkhadiev, “Solution of the generalized Saint Venant problem”, Sb. Math., 189:12 (1998), 1739–1748
Linking options:
https://www.mathnet.ru/eng/sm362https://doi.org/10.1070/sm1998v189n12ABEH000362 https://www.mathnet.ru/eng/sm/v189/i12/p3
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Abstract page: | 1230 | Russian version PDF: | 438 | English version PDF: | 39 | References: | 162 | First page: | 3 |
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